Hall polynomial: Difference between revisions
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The '''Hall polynomials''' in [[mathematics]] were developed by [[Philip Hall]] in the 1950s in the study of [[group representation]]s. | The '''Hall polynomials''' in [[mathematics]] were developed by [[Philip Hall]] in the 1950s in the study of [[group representation]]s. | ||
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==References== | ==References== | ||
* I.G. Macdonald, ''Symmetric functions and Hall polynomials'', (Oxford University Press, 1979) ISBN 0-19-853530-9[[Category:Suggestion Bot Tag]] | |||
* I.G. Macdonald, ''Symmetric functions and Hall polynomials'', (Oxford University Press, 1979) ISBN 0-19-853530-9 | |||
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Latest revision as of 11:00, 25 August 2024
The Hall polynomials in mathematics were developed by Philip Hall in the 1950s in the study of group representations.
A finite abelian p-group M is a direct sum of cyclic p-power components where is a partition of called the type of M. Let be the number of subgroups N of M such that N has type and the quotient M/N has type . Hall showed that the functions g are polynomial functions of p with integer coefficients: these are the Hall polynomials.
Hall next constructs an algebra with symbols a generators and multiplication given by the as structure constants
which is freely generated by the corresponding to the elementary p-groups. The map from to the algebra of symmetric functions given by is a homomorphism and its image may be interpreted as the Hall-Littlewood polynomial functions. The theory of Schur functions is thus closely connected with the theory of Hall polynomials.
References
- I.G. Macdonald, Symmetric functions and Hall polynomials, (Oxford University Press, 1979) ISBN 0-19-853530-9